Book contents
- Frontmatter
- Contents
- Preface
- 1 Quantum fields
- 2 Operators on the multi-particle state space
- 3 Quantum dynamics and Green's functions
- 4 Non-equilibrium theory
- 5 Real-time formalism
- 6 Linear response theory
- 7 Quantum kinetic equations
- 8 Non-equilibrium superconductivity
- 9 Diagrammatics and generating functionals
- 10 Effective action
- 11 Disordered conductors
- 12 Classical statistical dynamics
- Appendices
- Bibliography
- Index
6 - Linear response theory
Published online by Cambridge University Press: 24 December 2009
- Frontmatter
- Contents
- Preface
- 1 Quantum fields
- 2 Operators on the multi-particle state space
- 3 Quantum dynamics and Green's functions
- 4 Non-equilibrium theory
- 5 Real-time formalism
- 6 Linear response theory
- 7 Quantum kinetic equations
- 8 Non-equilibrium superconductivity
- 9 Diagrammatics and generating functionals
- 10 Effective action
- 11 Disordered conductors
- 12 Classical statistical dynamics
- Appendices
- Bibliography
- Index
Summary
There exists a regime of overlap between the equilibrium and non-equilibrium behavior of a system, the non-equilibrium behavior of weakly perturbed states. When a system is perturbed ever so slightly, its response will be linear in the perturbation, say the current of the conduction electrons in a metal will be proportional to the strength of the applied electric field. This regime is called the linear response regime, and though the system is in a non-equilibrium state all its characteristics can be inferred from the properties of its equilibrium state. In the next chapter we shall go beyond the linear regime by showing how to obtain quantum kinetic equations. The kinetic-equation approach to transport is a general method, and allows in principle nonlinear effects to be considered. However, in many practical situations one is interested only in the linear response of a system to an external force. The linear response limit is a tremendous simplification in comparison with general non-equilibrium conditions, and is the subject matter of this chapter. In particular the linear response of the density and current of an electron gas are discussed. The symmetry properties of response functions, and the fluctuation–dissipation theorem are established. Lastly we demonstrate how correlation functions can be measured in scattering experiments, as illustrated by considering neutron scattering from matter. Needless to say, in measurements of (say) the current in a macroscopic body, far less information in the current correlation function is probed.
Linear response
In this section we consider the response of an arbitrary property of a system to a general perturbation.
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- Chapter
- Information
- Quantum Field Theory of Non-equilibrium States , pp. 151 - 178Publisher: Cambridge University PressPrint publication year: 2007